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物元法分类动态综合评价方法及速度特征分析
  • ISSN号:1003-207X
  • 期刊名称:《中国管理科学》
  • 时间:0
  • 分类:O176[理学—数学;理学—基础数学] O174.41[理学—数学;理学—基础数学]
  • 作者机构:[1]Department of Mathematics, Sichuan University, Chengdu 610064, P. R. China
  • 相关基金:Project supported by the Key Program of National Natural Science Foundation of China (No. 70831005), the National Natural Science Foundation of China (No. 10671135), and the Fundamental Research Funds for the Central Universities (No. 2009SCU11096)
作者: 廖志高[1], 詹敏[1], 徐玖平[2]
关键词: 混合变分不等式, LIPSCHITZ, 梯度方法, 集值, Hilbert空间, 预计, 映射, 收敛, set-valued mixed Variational inequality (SMVI), projected subgradient method, non-Lipschitz mapping, convergence
中文摘要:

A projected subgradient method for solving a class of set-valued mixed variational inequalities (SMVIs) is proposed when the mapping is not necessarily Lipschitz. Under some suitable conditions, it can be proven that the sequence generated by the method can strongly converge to the unique solution to the problem in the Hilbert spaces.

英文摘要:

A projected subgradient method for solving a class of set-valued mixed variational inequalities (SMVIs) is proposed when the mapping is not necessarily Lipschitz. Under some suitable conditions, it can be proven that the sequence generated by the method can strongly converge to the unique solution to the problem in the Hilbert spaces.

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期刊信息
  • 《中国管理科学》
  • 中国科技核心期刊
  • 主管单位:中国科学院
  • 主办单位:中国优选法统筹法与经济数学研究会 中科院科技政策与管理科学研究所
  • 主编:蔡晨
  • 地址:北京海淀区中关村北一条15号(北京8712信箱)
  • 邮编:100190
  • 邮箱:zgglkx@casipm.ac.cn
  • 电话:010-62542629
  • 国际标准刊号:ISSN:1003-207X
  • 国内统一刊号:ISSN:11-2835/G3
  • 邮发代号:82-50
  • 获奖情况:
  • 国内外数据库收录:
  • 日本日本科学技术振兴机构数据库,中国中国人文社科核心期刊,中国中国科技核心期刊,中国北大核心期刊(2008版),中国北大核心期刊(2011版),中国北大核心期刊(2014版)
  • 被引量:25352